An Algorithm for the Traveling Salesman Problem

John D. C. Little
John D. C. Little
Massachusetts Institute of Technology
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,
Katta G. Murty
Katta G. Murty
Indian Statistical Institute
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Dura W. Sweeney
Dura W. Sweeney
International Business Machines Corporation
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Caroline Karel
Caroline Karel
Case Institute of Technology
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John D. C. Little

Massachusetts Institute of Technology

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Katta G. Murty

Indian Statistical Institute

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Dura W. Sweeney

International Business Machines Corporation

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Caroline Karel

Case Institute of Technology

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Published Online:1 Dec 1963https://doi.org/10.1287/opre.11.6.972

Abstract

A “branch and bound” algorithm is presented for solving the traveling salesman problem. The set of all tours (feasible solutions) is broken up into increasingly small subsets by a procedure called branching. For each subset a lower bound on the length of the tours therein is calculated. Eventually, a subset is found that contains a single tour whose length is less than or equal to some lower bound for every tour. The motivation of the branching and the calculation of the lower bounds are based on ideas frequently used in solving assignment problems. Computationally, the algorithm extends the size of problem that can reasonably be solved without using methods special to the particular problem.

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Volume 11, Issue 6

November-December 1963

Pages 863-1025

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John D. C. Little, Katta G. Murty, Dura W. Sweeney, Caroline Karel, (1963) An Algorithm for the Traveling Salesman Problem. Operations Research 11(6):972-989.

https://doi.org/10.1287/opre.11.6.972

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An Algorithm for the Traveling Salesman Problem

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Volume 11, Issue 6

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